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Congruence of Triangles By AAS Criteria

Triangles I - Concepts

Calculating Perimeter of Triangle

Congruence of Triangles

Congruence of Triangles By SAS Criteria

Congruence of Triangles By ASA Criteria

Congruence of Triangles By AAS Criteria

Class - 9th IMO Subjects

Concept Explanation

Congruence of Triangles by AAS Criteria

Theorem : If any two angles and a non-included side of one triangle are equal to the corresponding angles and side of another triangle, then the two triangles are congruent.

Given: Two $large Delta sABC$ and DEF such that

$large angle A=angle D,angle B=angle E, BC=EF$

To Prove: $large Delta ABCcong Delta DEF$

Proof: We have,

$large angle A=angle D;and;angle B=angle E$

$large Rightarrow ;;angle A+angle B=angle D+angle E$

$large because angle A+angle B+angle C=180^{circ};therefore angle A+angle B=180^{circ}-angle C$

Similarly, $large because angle D+angle E+angle F=180^{circ};therefore angle D+angle E=180^{circ}-angle F$

$large Rightarrow ;;180^{circ}-angle C=180^{circ}-angle F$

Arrange the terms, we have

$angle F-angle C=180^{0}-180^{0}$

$angle F-angle C=0$

$large Rightarrow ;;;angle C=angle F$ .....................(i)

Thus, in $large Delta sABC$ and DEF , we have

$large angle A=angle D,angle B=angle E$ and $large angle C=angle F$

Now, in $large Delta ABC$ and $large Delta DEF$ , we have

$large angle B=angle E$ [Given]

BC = EF [Given]

and, $large angle C=angle F$ [From (i)]

So, by ASA criterion of congruence, $large Delta ABCcong Delta DEF$

Hence Proved

Theorem: If two angles of a triangle are equal. then sides opposite to them are also equal.

Given: A $large Delta ABC$ in which $large angle B=angle C$

To Prove: AB = AC

Construction: Draw the bisector of $large angle A$ and Let it meet BC at D.

Proof: In $large Delta sABD$ and ACD, we have

$large angle B=angle C$ [Given]

$large angle BAC=angle CAD$ [Each 90 degrees] AD = AD

So, by AAS criterion of congruence, we have

$large Delta ABDcong Delta ACD$

$large Rightarrow ;;;AB=AC$ [C.P.C.T]

Illustration: If $bigtriangleup ABC$ is an isosceles triangle with AB = AC. Prove that the perpendiculars from the vertices B and C to their opposite sides are equal.

Solution: In $bigtriangleup ABC$ , we have

AB = AC [Given]

$Rightarrow angle B=angle C$ ..........................(i) [ $because$ Angles opposite to equal sides are equal]

Now, in $bigtriangleup BCE;and;BCD$ , we have

$angle B=angle C$ [From (i)]

$angle CEB=angle BDC$ [Each equal to $90^{0}$ ]

and, BD = BC [Common]

So, by AAS criterion of congruence, we have

$bigtriangleup BCE=bigtriangleup BCD$

$Rightarrow BD=CE$ [ $because$ Corresponding parts of congruent triangles are equal]

Hence, BD = CE

Sample Questions

(More Questions for each concept available in Login)

Question : 1

In the above figure if $small angle ACB=angle DEF$ , $small angle ABC=angle DFE$ and CB = EF then $small bigtriangleup ABCcong bigtriangleup DEF$ by AAS criteria. The above statement is __________________
A. Correct if criteria is changed to SAS criteria	B. Correct if criteria is changed to ASA criteria	C. AAS criteria is not possible according to the given conditions	D. Both B and C
Right Option : D
View Explanation

Question : 2

In this figure, in the triangles $small bigtriangleup ACB;and;DCE$ if $small angle CAB =angle CDE$ and CB = CE and both the triangles are congruent by AAS criteria. Then which of the following is true?
A. $small angle ACB=DCE$	B. $small angle CBA=angle DCE$	C. Both A and B	D. None of these
Right Option : A
View Explanation

Question : 3

In the figure above if $small angle CAB=angle CDE$ , CB = CE . If $small bigtriangleup ACBcong bigtriangleup DCE$ by AAS criterion, then by AAS criterion, then the third condition used for AAS is?
A. $small angle ACB=angle DCE$	B. $small angle B=angle E$	C. AC = CE	D. AAS is not possible
Right Option : A
View Explanation

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Attention !!!!!

Congruence of Triangles By AAS Criteria

Congruence of Triangles by AAS Criteria

Students / Parents Reviews [20]

Aman Kumar Shrivastava

Cheshta

Om Umang

Prisha Gupta

Barkha Arora

Aman Kumar Shrivastava

Aman Kumar Shrivastava

Ayan Ghosh

Eshan Arora

Manish Kumar

Yogansh Nyasi

Hridey Preet

Upmanyu Sharma

Shivam Rana

Archit Segal

Sharandeep Singh

Hiya Gupta

Ayan Ghosh

Yatharthi Sharma

Shreya Shrivastava